| A stabilized finite element method based on two local Gauss integrations for the Stokes equations J Li, Y He Journal of Computational and Applied Mathematics 214 (1), 58-65, 2008 | 253 | 2008 |
| Convergence of three iterative methods based on the finite element discretization for the stationary Navier–Stokes equations Y He, J Li Computer Methods in Applied Mechanics and Engineering 198 (15-16), 1351-1359, 2009 | 181 | 2009 |
| A stabilized finite element method based on local polynomial pressure projection for the stationary Navier–Stokes equations Y He, J Li Applied Numerical Mathematics 58 (10), 1503-1514, 2008 | 171 | 2008 |
| A new stabilized finite element method for the transient Navier–Stokes equations J Li, Y He, Z Chen Computer Methods in Applied Mechanics and Engineering 197 (1-4), 22-35, 2007 | 157 | 2007 |
| Local and parallel finite element algorithms for the Stokes problem Y He, J Xu, A Zhou, J Li Numerische Mathematik 109 (3), 415-434, 2008 | 123 | 2008 |
| A new stabilized finite volume method for the stationary Stokes equations J Li, Z Chen Advances in Computational Mathematics 30, 141-152, 2009 | 110 | 2009 |
| A domain decomposition method for the steady-state Navier-Stokes-Darcy model with Beavers-Joseph interface condition X He, J Li, Y Lin, J Ming SIAM Journal on Scientific Computing, 2015 | 107 | 2015 |
| A new local stabilized nonconforming finite element method for the Stokes equations J Li, Z Chen Computing 82, 157-170, 2008 | 69 | 2008 |
| A nonconforming virtual element method for the Stokes problem on general meshes X Liu, J Li, Z Chen Computer Methods in Applied Mechanics and Engineering 320, 694-711, 2017 | 63 | 2017 |
| Investigations on two kinds of two-level stabilized finite element methods for the stationary Navier–Stokes equations J Li Applied Mathematics and Computation 182 (2), 1470-1481, 2006 | 58 | 2006 |
| A domain decomposition method for the time-dependent Navier-Stokes-Darcy model with Beavers-Joseph interface condition and defective boundary condition C Qiu, X He, J Li, Y Lin Journal of Computational Physics 411, 109400, 2020 | 44 | 2020 |
| A weak Galerkin finite element method for the Oseen equations X Liu, J Li, Z Chen Advanced in Computational Mathematics, 2016 | 44 | 2016 |
| A stabilized finite volume element method for a coupled Stokes–Darcy problem R Li, J Li, X He, Z Chen Applied Numerical Mathematics 133, 2-24, 2018 | 43 | 2018 |
| A Stabilized Finite Element Method Based on Two Local Gauss Integrations for a Coupled Stokes-Darcy R Li, J Li, Z Chen, Y Gao Journal of Computational and Applied Mathematics 292, 92-104, 2016 | 43 | 2016 |
| Two-level penalized finite element methods for the stationary Navier-Stoke equations Y He, J Li, X Yang Int. J. Inf. Syst. Sci 2 (1), 131-143, 2006 | 43 | 2006 |
| A penalty finite element method based on the Euler implicit/explicit scheme for the time-dependent Navier–Stokes equations Y He, J Li Journal of computational and applied mathematics 235 (3), 708-725, 2010 | 41 | 2010 |
| Performance of several stabilized finite element methods for the Stokes equations based on the lowest equal-order pairs J Li, Y He, Z Chen Computing 86, 37-51, 2009 | 41 | 2009 |
| A stabilized multi-level method for non-singular finite volume solutions of the stationary 3D Navier–Stokes equations J Li, Z Chen, Y He Numerische Mathematik 122 (2), 279-304, 2012 | 38 | 2012 |
| Convergence and stability of a stabilized finite volume method for the stationary Navier-Stokes equations J Li, L Shen, Z Chen BIT Numerical Mathematics 50 (4), 823-842, 2010 | 38 | 2010 |
| A weak Galerkin finite element method for the Navier–Stokes equations X Liu, J Li, Z Chen Journal of Computational and Applied Mathematics 333, 442-457, 2018 | 37 | 2018 |
Zhangxin ChenUniversity of CalgaryVerified email at ucalgary.ca
